Uniform algebra




A uniform algebra A on a compact Hausdorff topological space X is a closed (with respect to the uniform norm) subalgebra of the C*-algebra C(X) (the continuous complex valued functions on X) with the following properties:



the constant functions are contained in A

for every x, y {displaystyle in }in X there is f{displaystyle in }in A with f(x){displaystyle neq }neq f(y). This is called separating the points of X.


As a closed subalgebra of the commutative Banach algebra C(X) a uniform algebra is itself a unital commutative Banach algebra (when equipped with the uniform norm). Hence, it is, (by definition) a Banach function algebra.


A uniform algebra A on X is said to be natural if the maximal ideals of A precisely are the ideals Mx{displaystyle M_{x}}M_x of functions vanishing at a point x in X.



Abstract characterization


If A is a unital commutative Banach algebra such that ||a2||=||a||2{displaystyle ||a^{2}||=||a||^{2}}{displaystyle ||a^{2}||=||a||^{2}} for all a in A, then there is a compact Hausdorff X such that A is isomorphic as a Banach algebra to a uniform algebra on X. This result follows from the spectral radius formula and the Gelfand representation.








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